1000 people vote in 10 districts. Their choices are a Hard-Right party, a Centrist Party, and a Left coalition, representing the Left-Centre, Left, and Hard Left. PS: This is what the French had going on.
Let’s say 373 people wanted the Hard Right party, 269 people wanted the Left-Wing Coalition, 223 wanted the centre, 51 picked a minor libertarian party, 50 picked from a slew of minor parties not on the Right, and 35 picked from other Right-Wing parties.
In a proportional representation system, you’d expect 37.3% of the representatives be from the Hard-Right party, 26.9% from the Left-Wing Coalition, 22.3% from the Centrist party, plus about 14% being from minor parties. But France uses a First Past the Post system and so does our hypothetical nation. So here we go:
Riding 1: 95 people voted Hard Right. 3 vote Centre, and one each vote other Right and Libertarian. Hard Right wins this riding.
Riding 2: 90 vote Hard Right, 5 vote Centre, 2 vote Other Right, 1 votes other Non-Right, and two vote Libertarian. Right wins this riding.
Riding 3: 85 vote Hard Right, 10 vote Centre, 1 votes Left, 3 vote Other Right, and one votes Libertarian. Winner is Hard Right.
Riding 4: 15 vote Hard Right, 65 vote Centre, 10 vote Left, while 2 vote Other Right, 5 vote Other Non-Right, and 3 vote Libertarian. Centre wins.
Riding 5: 12 vote Hard Right, 60 vote Centre, 12 vote Left, while 4, 8, and 4 vote for minor parties. Centre wins.
Riding 6: 20 each vote Hard Right and Centre, while 3, 4, and 2 vote third parties. Left gets 51 votes and wins the riding.
Riding 7: 22 vote Hard Right and 11 vote Centre. 2, 9, and 4 vote Third Party, and Left wins the riding with 52 votes.
Riding 8: 15 vote Hard Right and 21 vote Centre. 3, 5, and 5 vote Third Party, and Left wins again, this time with 51 votes.
Riding 9: 10 vote Hard Right and 14 vote Centre, while an amazing 8, 10, and 8 votes being sent to the Third Parties. However, Left once again takes the riding with 50 votes.
Riding 10: 9 people vote Hard Right, while 14 vote Centre. Another 21 vote Libertarian, with 7 voting minor right-wing third parties, and 7 voting for non-right-wing minor parties. Despite these 50 people likely having more in common with each other than with the Hard Right or the Left, because they couldn’t agree on one candidate to vote for, their votes get split, allowing the Left to win the riding with 42 votes.
End result: 3 Right, 2 Moderate, and a whopping 5 Left. It didn’t go this badly for the non-Left parties in France, but it illustrates how a party with a lower vote share can get more representation in a First Past the Post system. It illustrates why Gerrymandering is bad. If those voters in the first three districts are packed there because some partisan power broker got into the redistricting process, they’ve basically been defanged by political shenanigans. Doubly so if the left-wing coalition managed to spread all their voters out so that they had a solid lock on 5 of the districts.
This is a fundamental problem with FPTP, so that’s why many of us advocate for RCV or Proportional systems.
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1000 people vote in 10 districts. Their choices are a Hard-Right party, a Centrist Party, and a Left coalition, representing the Left-Centre, Left, and Hard Left. PS: This is what the French had going on.
Let’s say 373 people wanted the Hard Right party, 269 people wanted the Left-Wing Coalition, 223 wanted the centre, 51 picked a minor libertarian party, 50 picked from a slew of minor parties not on the Right, and 35 picked from other Right-Wing parties.
In a proportional representation system, you’d expect 37.3% of the representatives be from the Hard-Right party, 26.9% from the Left-Wing Coalition, 22.3% from the Centrist party, plus about 14% being from minor parties. But France uses a First Past the Post system and so does our hypothetical nation. So here we go:
Riding 1: 95 people voted Hard Right. 3 vote Centre, and one each vote other Right and Libertarian. Hard Right wins this riding. Riding 2: 90 vote Hard Right, 5 vote Centre, 2 vote Other Right, 1 votes other Non-Right, and two vote Libertarian. Right wins this riding. Riding 3: 85 vote Hard Right, 10 vote Centre, 1 votes Left, 3 vote Other Right, and one votes Libertarian. Winner is Hard Right. Riding 4: 15 vote Hard Right, 65 vote Centre, 10 vote Left, while 2 vote Other Right, 5 vote Other Non-Right, and 3 vote Libertarian. Centre wins. Riding 5: 12 vote Hard Right, 60 vote Centre, 12 vote Left, while 4, 8, and 4 vote for minor parties. Centre wins. Riding 6: 20 each vote Hard Right and Centre, while 3, 4, and 2 vote third parties. Left gets 51 votes and wins the riding. Riding 7: 22 vote Hard Right and 11 vote Centre. 2, 9, and 4 vote Third Party, and Left wins the riding with 52 votes. Riding 8: 15 vote Hard Right and 21 vote Centre. 3, 5, and 5 vote Third Party, and Left wins again, this time with 51 votes. Riding 9: 10 vote Hard Right and 14 vote Centre, while an amazing 8, 10, and 8 votes being sent to the Third Parties. However, Left once again takes the riding with 50 votes. Riding 10: 9 people vote Hard Right, while 14 vote Centre. Another 21 vote Libertarian, with 7 voting minor right-wing third parties, and 7 voting for non-right-wing minor parties. Despite these 50 people likely having more in common with each other than with the Hard Right or the Left, because they couldn’t agree on one candidate to vote for, their votes get split, allowing the Left to win the riding with 42 votes.
End result: 3 Right, 2 Moderate, and a whopping 5 Left. It didn’t go this badly for the non-Left parties in France, but it illustrates how a party with a lower vote share can get more representation in a First Past the Post system. It illustrates why Gerrymandering is bad. If those voters in the first three districts are packed there because some partisan power broker got into the redistricting process, they’ve basically been defanged by political shenanigans. Doubly so if the left-wing coalition managed to spread all their voters out so that they had a solid lock on 5 of the districts.
This is a fundamental problem with FPTP, so that’s why many of us advocate for RCV or Proportional systems.